Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation
We consider the data-driven newsvendor problem in which a manager makes inventory decisions sequentially and learns the unknown demand distribution based on observed samples of continuous demand (no truncation). We study the widely used sample average approximation (SAA) approach and analyze its per...
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sg-smu-ink.lkcsb_research-83122023-10-26T01:42:05Z Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation LIN, Meichun HUH, Woonhee Tim KRISHNAN, H We consider the data-driven newsvendor problem in which a manager makes inventory decisions sequentially and learns the unknown demand distribution based on observed samples of continuous demand (no truncation). We study the widely used sample average approximation (SAA) approach and analyze its performance with respect to regret, which is the difference between its expected cost and the optimal cost of the clairvoyant who knows the underlying demand distribution. We characterize how the regret performance depends on a minimal separation assumption that restricts the local flatness of the demand distribution around the optimal order quantity. In particular, we consider two separation parameters, gamma and epsilon, where gamma denotes the minimal possible value of the density function in a small neighborhood of the optimal quantity and epsilon defines the size of the neighborhood. We establish a lower bound on the worst case regret of any policy that depends on the product of the separation parameters gamma epsilon and the time horizon N. We also show a finite-time upper bound of SAA that matches the lower bound in terms of the separation parameters and the time horizon (up to a logarithmic factor of N). This illustrates the near-optimal performance of SAA with respect to not only the time horizon, but also the local flatness of the demand distribution around the optimal quantity. Our analysis also shows upper bounds of O(log N) and O(root N) on the worst case regret of SAA over N periods with and without the minimal separation assumption. Both bounds match the lower bounds implied by the literature, which illustrates the asymptotic optimality of the SAA approach. 2022-06-14T07:00:00Z text https://ink.library.smu.edu.sg/lkcsb_research/7313 info:doi/10.1287/opre.2022.2307 Research Collection Lee Kong Chian School Of Business eng Institutional Knowledge at Singapore Management University sample average approximation newsvendor problem data-driven decision making regret analysis finite-time performance Operations and Supply Chain Management Operations Research, Systems Engineering and Industrial Engineering |
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sample average approximation newsvendor problem data-driven decision making regret analysis finite-time performance Operations and Supply Chain Management Operations Research, Systems Engineering and Industrial Engineering LIN, Meichun HUH, Woonhee Tim KRISHNAN, H Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
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We consider the data-driven newsvendor problem in which a manager makes inventory decisions sequentially and learns the unknown demand distribution based on observed samples of continuous demand (no truncation). We study the widely used sample average approximation (SAA) approach and analyze its performance with respect to regret, which is the difference between its expected cost and the optimal cost of the clairvoyant who knows the underlying demand distribution. We characterize how the regret performance depends on a minimal separation assumption that restricts the local flatness of the demand distribution around the optimal order quantity. In particular, we consider two separation parameters, gamma and epsilon, where gamma denotes the minimal possible value of the density function in a small neighborhood of the optimal quantity and epsilon defines the size of the neighborhood. We establish a lower bound on the worst case regret of any policy that depends on the product of the separation parameters gamma epsilon and the time horizon N. We also show a finite-time upper bound of SAA that matches the lower bound in terms of the separation parameters and the time horizon (up to a logarithmic factor of N). This illustrates the near-optimal performance of SAA with respect to not only the time horizon, but also the local flatness of the demand distribution around the optimal quantity. Our analysis also shows upper bounds of O(log N) and O(root N) on the worst case regret of SAA over N periods with and without the minimal separation assumption. Both bounds match the lower bounds implied by the literature, which illustrates the asymptotic optimality of the SAA approach. |
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text |
| author |
LIN, Meichun HUH, Woonhee Tim KRISHNAN, H |
| author_facet |
LIN, Meichun HUH, Woonhee Tim KRISHNAN, H |
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LIN, Meichun |
| title |
Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
| title_short |
Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
| title_full |
Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
| title_fullStr |
Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
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Technical Note: Data-driven newsvendor problem: Performance of the sample average approximation |
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technical note: data-driven newsvendor problem: performance of the sample average approximation |
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Institutional Knowledge at Singapore Management University |
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2022 |
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https://ink.library.smu.edu.sg/lkcsb_research/7313 |
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